Almost periodic pseudodifferential operators and Gevrey classes

Abstract

We study almost periodic pseudodifferential operators acting on almost periodic functions G aps( d) of Gevrey regularity index s ≥ 1. We prove that almost periodic operators with symbols of H\"ormander type S,δm satisfying an s-Gevrey condition are continuous on G aps( d) provided 0 < ≤ 1, δ=0 and s ≥ 1. A calculus is developed for symbols and operators using a notion of regularizing operator adapted to almost periodic Gevrey functions and its duality. We apply the results to show a regularity result in this context for a class of hypoelliptic operators.